VMEC: Difference between revisions

The three-dimensional Variational Moments Equilibrium Code (VMEC) minimizes the energy functional

${\displaystyle W=\int _{\Omega _{p}}{\left({\frac {1}{2\mu _{0}}}B^{2}+p\right)dV}}$

over the toroidal domain Ω_p. The solution is obtained in flux coordinates (s, θ, ζ), related to the cylindrical coordinates (R, φ, Z) by

${\displaystyle R=\sum {R_{mn}(s)\cos(m\theta -n\zeta )}}$

${\displaystyle Z=\sum {Z_{mn}(s)\sin(m\theta -n\zeta )}}$

The code assumes nested flux surfaces. ^{[1] [2]}

Implementations of the code

The code is being used at:

• ORNL, Oak Ridge, TN, USA (code origin)
• PPPL, Princeton, NJ, USA
• IPP, at Garching and Greifswald, Germany
• CRPP, Lausanne, Switzerland
• NIFS, Japan
• RFX, Padova. Italy
• LNF, Spain

Enhancements / extensions of the code

• DIAGNO, ^[3] to calculate the response of magnetic diagnostics
• MFBE ^[4]
• STELLOPT ^[5]

References